procedure max (a[1..n]: integers)
max := a[1]
for i := 2 to n
if max < a[i] then max := a[i]
Is the complexity O(1)
or O(n)
with the best case scenario? The sequence contains n
elements. It is pseudocode.
Is the complexity 


There's no difference between the best case and worst case asymptotic running times for this algorithm. In all cases, you have to traverse the whole array ( Theoretically, there's no way you can find the maximum element of an arbitrary array in less than O(n) since you should always visit each element at least once. 


O(n)  you have to scan n elements, or a factor of n (n/2, n/4 etc)  still O(n). 


The algorithm is 


If you have code that reads:
Then that code will be O(n) best case. I'm curious why you think it might be constant time? 


Roughly, O(1) means that whatever the size of the input, you can implement the solution in fixed number of steps. O(n) means that if you have n inputs, the solution will be implemented in An steps (where A is a number, not another variable). Clearly, if you have for loop which counts from 2 to n, that is n cycles, meaning that if you have An input elements, your loop will count from 2 to An, meaning that it is on the same level az the input, so it's O(n). But that's how linear scanning is. :) 


You have to traverse the whole array. So the complexity would be O(n). 


O(n) you can achieve the O(1) if the array was sorted, so you'll just return the last element. but in random arranged elements the best order for this problem is O(n) 

